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Korean–Russian
Algebraic Geometry Meeting
April 6, 2019 10:30–11:30, Moscow, Laboratory of Mirror Symmetry, NRU HSE, 6 Usacheva St., Room 427
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Tropical mirror symmetry for toric variaties
A. Losevab
a HSE
b Institute for Theoretical and Experimental Physics
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Abstract:
We consider tropical curves in a tropical toric manifold that pass through the tropical cycles. Such curves are represented by a special kind of trees in the polygon that represents tropical toric manifold. The Gromov–Witten invariant appears from counting such trees with proper weights. We show that trees are just Feynman diagrams in the BCOV-like quantum field theory that represents the type B side of the mirror. We conjecture how this interpretation of mirror may be generalized to a general tropic manifold.
Language: English
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